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===[[American Invitational Mathematics Examination]]===
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===[[Logarithm]]===
The '''American Invitational Mathematics Examination''' ('''AIME''') is the second exam in the series of exams used to challenge bright students on the path toward choosing the team that represents the United States at the [[International Mathematics Olympiad]] (IMO)While most AIME participants are high school students, some bright middle school students also qualify each year.
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{{WotWAlso}}
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'''Logarithms''' and [[exponents]] are very closely related.  In fact, they are [[Function/Introduction#The_Inverse_of_a_Function|inverse]] [[function]]s.  This means that logarithms can be used to reverse the result of exponentiation and vice versa, just as addition can be used to reverse the result of subtractionThus, if we have <math> a^x = b </math>, then taking the logarithm with base <math> a</math> on both sides will give us <math>x=\log_a{b}</math>.
  
High scoring AIME students are invited to take the prestigious [[United States of America Mathematics Olympiad]] (USAMO).
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We would read this as "the logarithm of b, base a, is x".  For example, we know that <math>3^4=81</math>. To express the same fact... [[Logarithm|[more]]]
 
 
The AIME is administered by... [[American Invitational Mathematics Examination|[more]]]
 
 
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Revision as of 19:07, 3 December 2007

Logarithm

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Logarithms and exponents are very closely related. In fact, they are inverse functions. This means that logarithms can be used to reverse the result of exponentiation and vice versa, just as addition can be used to reverse the result of subtraction. Thus, if we have $a^x = b$, then taking the logarithm with base $a$ on both sides will give us $x=\log_a{b}$.

We would read this as "the logarithm of b, base a, is x". For example, we know that $3^4=81$. To express the same fact... [more]